If one root is nth power of the other root of this equation `x^(2)-ax+b=0` then `b^(n/(n+1))+b^(1/(n+1))=`

if one root is n xx the other root of the quadratic equation ax^(2)-bx+c=0 then

The roots of the equation ax+(a+b)x-b*=0 are

Roots of the equation x^(n)-1=0,n in I

If alpha and beta are the roots of the equation x^(2)-ax+b=0 and A_(n)=alpha^(n)+beta^(n)

The equation whose roots are nth power of the roots of the equation,x^(2)-2x cos phi+1=0 is given by

If a and b are roots of the equation x^2+a x+b=0 , then a+b= (a) 1 (b) 2 (c) -2 (d) -1

If one root of the quadratic equation ax^(2)+bx+c=0 is equal to the nth power of the other , then show that (ac^n)^((1)/(n+1))+(a^(n)c)^((1)/(n+1))+b=0 .